We prove three facts about intrinsic geometry of surfaces in a normed (Minkowski ) space. When put together, these facts demonstrate a rather intriguing picture. Submission history. From: Sergei Ivanov [view email] [v1] Thu, 5 May 54 UTC (10 KB) [v2] Mon, 6 Jun UTC (11 KB). Submission history. From: Sergei Ivanov [view email] [v1] Mon, 8 Oct 52 UTC (15 KB) [v2] Sun, 23 Jun UTC (16 KB).
|Published (Last):||15 April 2013|
|PDF File Size:||17.41 Mb|
|ePub File Size:||9.95 Mb|
|Price:||Free* [*Free Regsitration Required]|
Access denied no subscription detected We’re sorry, but we are unable to provide you with the full text of this article because we are not able to identify you as a subscriber.
If you have a personal subscription to this journal, then please login. If you are already logged in, then you may need to update your profile to register your subscription.
 Conjugation-invariant norms on groups of geometric origin
Read more about accessing full-text. This paper is a ivanog of our paper about boundary rigidity and filling minimality of metrics close to flat ones.
We show that compact regions close to a hyperbolic one are boundary distance rigid and strict minimal fillings. We also provide a more invariant view on the approach used in the above-mentioned paper. Permanent link to this document https: Zentralblatt MATH identifier Integral geometry [See also 52A22, 60D05]; bugago forms, currents, etc.
Burago, Dmitri; Ivanov, Sergei. Area minimizers and boundary rigidity of almost hyperbolic metrics.
Burago , Ivanov : On intrinsic geometry of surfaces in normed spaces
More by Dmitri Burago Search this author in: Google Scholar Project Euclid. More by Sergei Ivanov Search this author in: Read more about accessing full-text Buy article.
Abstract Article info and citation First page References Abstract This paper is a continuation of our paper about boundary rigidity and filling minimality of metrics close to flat ones.
Article information Source Duke Math.
Dates First available in Ivqnov Euclid: Download Email Please enter a valid email address. MR Digital Object Identifier: You have access to this content.
You have partial access to this content. You do not have access to this content.